Critical random graphs: Diameter and mixing time
Abstract
Let C1 denote the largest connected component of the critical Erdos--R\'enyi random graph G(n,1n). We show that, typically, the diameter of C1 is of order n1/3 and the mixing time of the lazy simple random walk on C1 is of order n. The latter answers a question of Benjamini, Kozma and Wormald. These results extend to clusters of size n2/3 of p-bond percolation on any d-regular n-vertex graph where such clusters exist, provided that p(d-1)1+O(n-1/3).
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